Definitions from the Web
Point in Hyperbolic Geometry
A point in hyperbolic geometry refers to a fundamental element that does not have size, shape, or any other measurable attributes. It is the most basic building block in the hyperbolic space.
Sample Sentences:
- In hyperbolic geometry, a point is defined as the intersection of two geodesic lines.
- The hyperbolic plane contains infinitely many points.
- Points in hyperbolic space can be located using hyperbolic coordinates.
- Euclidean and hyperbolic geometry differ in their properties of points, as hyperbolic geometry allows for multiple parallels through a point.
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